Restriction of characters to subgroups of wreath products and basic sets for the symmetric group

Abstract

In this paper, we give the decomposition into irreducible characters of the restriction to the wreath product Zp-1 Sw of any irreducible character of (Zp Zp-1) Sw, where p is any odd prime, w ≥ 0 is an integer, and Zp and Zp-1 denote the cyclic groups of order p and p-1 respectively. This answers the question of how to decompose the restrictions to p-regular elements of irreducible characters of the symmetric group Sn in the Z-basis corresponding to the p-basic set of Sn described by Brunat and Gramain in [1]. The result is given in terms of the Littlewood-Richardson coefficients for the symmetric group.